General harmonic measures for distance-expanding dynamical systems

Abstract

Partially motivated by the study of I. Binder, N. Makarov, and S. Smirnov [BMS03] on dimension spectra of polynomial Cantor sets, we initiate the investigation on some general harmonic measures, inspired by Sullivan's dictionary, for distance-expanding dynamical systems. Let f X X be an open distance-expanding map on a compact metric space (X,). A Gromov hyperbolic tile graph associated to the dynamical system (X,f) is constructed following the ideas from M. Bonk, D. Meyer [BM17] and P. Ha\"issinsky, K. M. Pilgrim [HP09]. We consider a class of one-sided random walks associated with (X,f) on . They induce a Martin boundary of the tile graph, which may be different from the hyperbolic boundary. We show that the Martin boundary of such a random walk admits a surjection to X. We provide a class of examples to show that the surjection may not be a homeomorphism. Such random walks also induce measures on X called harmonic measures. When is a visual metric, we establish an equality between the fractal dimension of the harmonic measure and the asymptotic quantities of the random walk.

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